A note on normal generation and generation of groups

Abstract

In this note we study sets of normal generators of finitely presented residually p-finite groups. We show that if an infinite, finitely presented, residually p-finite group G is normally generated by g1,…,gk with order n1,…,nk ∈ \1,2,… \ \∞ \, then β1(2)(G) ≤ k-1-Σi=1k 1ni, where β1(2)(G) denotes the first 2-Betti number of G. We also show that any k-generated group with β1(2)(G) ≥ k-1- must have girth greater than or equal 1/.